Annotation of OpenXM/src/asir-contrib/testing/rewriting.rr, Revision 1.1
1.1 ! takayama 1: /* $OpenXM$ */
! 2:
! 3: /*
! 4: OpenXM$BHG$N(B Risa/Asir $B$G<B9T$N$3$H(B. OpenXM $BHG$N4X?t$rMQ$$$k$?$a(B.
! 5: */
! 6: /* $Id: quote2.rr,v 1.5 2005/03/30 05:03:44 taka Exp $
! 7: $B$3$N%U%!%$%k$O(B quotetolist $B$G%j%9%H$KJQ49$7$?%G!<%?$KBP$7$F(B
! 8: $B%Q%?!<%s%^%C%A$*$h$S$=$l$r1~MQ$7$?JQ7A$r9T$&(B.
! 9: $B%F%9%H%W%m%0%i%`$N$?$a8zN($OL5;k(B. (append $B$NB?MQ(B, $BL5BL$J(B2$B=E8F$S=P$7(B, $B$J$I(B))
! 10: */
! 11:
! 12: extern Debug$
! 13: Debug=0$
! 14: def dprint(X) {
! 15: if (Debug) print(X);
! 16: }
! 17: def dprint0(X) {
! 18: if (Debug) print(X,0);
! 19: }
! 20:
! 21: /*
! 22: $BJQ?t%Q%?!<%s$N=q$-J}(B
! 23: pn(name) pattern $B$NA0$H8e$m$r$H$j(B pn
! 24: pn("x")
! 25:
! 26: Todo: pn(name,length,type)
! 27: pn("x","rest")?
! 28:
! 29: $B4X?t%Q%?!<%s$N=q$-J}(B. (Todo)
! 30: fn(name,argv)
! 31: fn("f",1,23) --> f(1,23) $B$X(B.
! 32: */
! 33:
! 34: /*
! 35: Rule $B$NNc(B1:
! 36: sin(3*@pi) $BEy$r(B 0 $B$K=q$-49$($kNc(B:
! 37: quote(sin(pn("n")*@pi))
! 38: --> f(n)
! 39:
! 40: def f(X) { if (X$B$,@0?t(B) return 0; else sin(X*@pi); }
! 41:
! 42: Rule $B$N:8JU$O(B quote $B7?$N%Q%?!<%s(B. $B1&JU$O$+$J$i$:(B asir $B$N4X?t(B.
! 43:
! 44: [function,sin,[b_op,*,[function,pn,[internal,x]],[function,@pi]]]
! 45: [function,fn,[internal,f],[internal,x]]
! 46:
! 47: $B2<$N(B test0(), test1(), test2() $B$r;2>H(B.
! 48: */
! 49:
! 50: /*
! 51: $BNc(B: $BITDj@QJ,(B. test3() $B$r;2>H(B.
! 52: */
! 53:
! 54: /* Todo:
! 55: $BNc(B. Mathematica $B$N(B N[ ] $BAjEv$N4X?t$r%f!<%6$,=q$1$k$h$&$K(B.
! 56: nn(sin(cos(@pi)+sqrt(2)))
! 57: --> nn(sin(nn(cos(nn(@pi)))+nn(sqrt(nn(2)))))
! 58:
! 59: $BNc(B: $BQQ5i?t$N7W;;$r(B quote $B$G<B8=(B.
! 60: sort $B$d(B expand $B$OAH$_9~$_$G(B.
! 61:
! 62: $BNc(B: Mathematica $B$N(B Expand[], Toghether[] $BAjEv$N$b$N(B.
! 63:
! 64: $BNc(B: D $B$N3]$1;;$r(B $B%Q%?!<%s%^%C%A$G<B8=(B.
! 65:
! 66: $BNc(B: (x^(1/n))^n --> x $BEy(B.
! 67:
! 68: */
! 69:
! 70: /*
! 71: $B%H%C%W%l%Y%k$N4X?tC#(B. (stylesheet $B$N9M$($K;w$F$k(B.)
! 72: apply_rule1(Obj,rule).
! 73: apply_rule1 $B$O(B iterator $B$N0l<o(B. $B1&JU$O$D$M$K4X?t(B.
! 74:
! 75: Todo: rules $B$O%f!<%6Dj5A$N$b$N$H(B default rule $BL>$,$"$k(B.
! 76: $B$?$H$($P(B sort $B$H$+E83+(B, 0 $B$N:o=|$OAH$_9~$_(B rule $B$H$7$FM_$7$$(B.
! 77: */
! 78:
! 79: def node(F) {
! 80: return [F[0],F[1]];
! 81: }
! 82: /* Number of child */
! 83: def nchild(F) {
! 84: return length(F)-2;
! 85: }
! 86: def child(F,K) {
! 87: return F[K+2];
! 88: }
! 89:
! 90: /*
! 91: $B%j%9%H(B F $B$,(B $B%j%9%H(B P $B$K(B($B@hF,$+$i$NHf3S$G(B)$B%^%C%A$7$?$i(B 1.
! 92: $B$=$&$G$J$$$+$i(B 0. $BI}M%@hC5:w(B.
! 93: Todo: P $B$KG$0U4X?t$r4^$`;EAH$_$O$^$@<BAu$7$F$J$$(B.
! 94: $B$?$H$($P(B quote(nn(fn("f")))
! 95: $B$3$N>l9g(B quote(nn(sin(1.3))) $B$K(B f=sin , $B0z?t(B 1.3 $B$G(B match.
! 96: $B$3$N>l9g(B quote(nn(cos(1.3))) $B$K(B f=cos , $B0z?t(B 1.3 $B$G(B match.
! 97: nn(f(g(x)+h(x))) --> nn(f(nn(g(x))+nn(h(x)))) $B$H$7$?$$(B.
! 98:
! 99: */
! 100: def match0(F,P) {
! 101: dprint0("F="); dprint(F);
! 102: dprint0("P="); dprint(P);
! 103:
! 104: if (type(F) != type(P)) return 0;
! 105: if (type(F) != 4) {
! 106: if (F == P) return 1;
! 107: else return 0;
! 108: }
! 109: Node = node(F);
! 110: Node2 = node(P);
! 111: if (Node2 == ["function","pn"]) return 2;
! 112: if (Node != Node2) return 0;
! 113: N = nchild(F);
! 114: if (N != nchild(P)) return 0;
! 115: for (I=0; I<N; I++) {
! 116: C = child(F,I);
! 117: C2 = child(P,I);
! 118: if (!match0(C,C2)) return 0;
! 119: }
! 120: return 1;
! 121: }
! 122:
! 123: /* F $B$H(B P $B$,(B match0 $B$9$k$H$-(B bindingTable $B$r$b$I$9(B.
! 124: [[$BJQ?t$NL>A0(B($BJ8;zNs(B), $BCM(B(list)], ...]
! 125: */
! 126: def makeBind(F,P) {
! 127: Ans = [ ];
! 128: if (F == P) return Ans;
! 129:
! 130: Node = node(F);
! 131: Node2 = node(P);
! 132:
! 133: if (Node2 == ["function", "pn"]) {
! 134: Ans = append(Ans,[[P[2][1],F]]);
! 135: return Ans;
! 136: }
! 137: N = nchild(F);
! 138: for (I=0; I<N; I++) {
! 139: C = child(F,I);
! 140: C2 = child(P,I);
! 141: Ans = append(Ans,makeBind(C,C2));
! 142: }
! 143: return Ans;
! 144: }
! 145:
! 146: /*
! 147: Tree $B$NCf$rI}M%@hC5:w$G8!:w$7$F(B $BCV$-49$($k(B.
! 148: $BI}M%@hC5:w$J$N$G(B, $BF1$8(B rule $B$K%^%C%A$9$k$b$N$,F~$l;R$K$J$C$?>l9g(B,
! 149: $BFbB&$OCV$-49$($i$l$J$$(B.
! 150: Todo: $B?<$5M%@hC5:w(B.
! 151: Todo: $B=q$-49$($,$*$3$C$?$+$N%U%i%0(B.
! 152: */
! 153: def rp(F,P,Q) {
! 154: dprint0("rp, F="); dprint(F);
! 155: dprint0("rp, P="); dprint(P);
! 156: dprint0("rp, Q="); dprint(P);
! 157: if (match0(F,P)) {
! 158: BindTable = makeBind(F,P);
! 159: dprint0("BindTable="); dprint(BindTable);
! 160: return applyfunction0(Q,BindTable);
! 161: }
! 162: if (type(F) != 4) return F;
! 163: Node = node(F);
! 164: N = nchild(F);
! 165: Ans = Node;
! 166: for (I=0; I<N; I++) {
! 167: T = rp(child(F,I),P,Q);
! 168: Ans = append(Ans,[T]);
! 169: }
! 170: return Ans;
! 171: }
! 172:
! 173: /* ["f","x"],[["x",[internal,3]]] $B$N;~$O(B
! 174: f(3) $B$r7W;;$9$k(B.
! 175: */
! 176: def applyfunction0(Q,BindTable) {
! 177: B = [ ];
! 178: N = length(BindTable);
! 179: /* BindTable $B$N1&JUCM$r(B quote(...) $B$J$kJ8;zNs$K(B */
! 180: for (I=0; I<N; I++) {
! 181: B = append(B,[[BindTable[I][0],"quote("+quote_input_form_quote_list(BindTable[I][1])+")"]]);
! 182: }
! 183: dprint0("applyfunction0: "); dprint(B);
! 184: N = length(Q)-1; /* $B0z?t$N?t(B */
! 185: M = length(B); /* binding table $B$N%5%$%:(B */
! 186: R = Q[0]+"(";
! 187: for (I=0; I<N; I++) {
! 188: X = rtostr(Q[I+1]); /* $BJQ?t(B */
! 189: /* binding Table $B$r%5!<%A(B */
! 190: for (J=0; J<M; J++) {
! 191: Y = rtostr(B[J][0]);
! 192: if (X == Y) {
! 193: R = R+B[J][1];
! 194: if (I != N-1) R = R+",";
! 195: break;
! 196: }
! 197: if (J == M-1) error("No binding data.");
! 198: }
! 199: }
! 200: R = R+")";
! 201: dprint0("R="); dprint(R);
! 202: return eval_str(R);
! 203: }
! 204:
! 205: /* $B1&5,B'4X?t(B. sin($B@0?t(B*@pi) $B$r(B 0 $B$K(B */
! 206: def r_sin_int(X) {
! 207: /* $B$$$^(B X $B$O(B quote $B7?(B */
! 208: Y = quotetolist(X);
! 209: /* Todo: $B$3$N$h$&$J$b$N$r:n$k5!G=$OAH$_9~$_$GM_$7$$(B. */
! 210: R = "quote(sin("+quote_input_form_quote_list(Y)+"*@pi))";
! 211: print(R);
! 212: R = eval_str(R);
! 213: /* Todo: X $B$,(B $B?t;z$+$I$&$+D4$Y$k5!G=$bAH$_9~$_$GM_$7$$(B.
! 214: */
! 215: if (Y[0] == "internal") {
! 216: Z = eval_str(rtostr(Y[1]));
! 217: }else{
! 218: return quotetolist(R);
! 219: }
! 220: if (type(Z) == 0) return quotetolist(quote(0));
! 221: if ((type(Z) == 1) && (ntype(Z) == 0)) return quotetolist(quote(0));
! 222: return quotetolist(R);
! 223: }
! 224:
! 225: /* L $B$,:85,B'(B. R $B$,1&5,B'(B. $BI}M%@hC5:w(B.
! 226: $BNc(B:
! 227: apply_rule1(quote(1+sin(3*@pi)*sin(@pi/2)),
! 228: quote(sin(pn("x")*@pi)),
! 229: ["r_sin_int","x"]);
! 230: */
! 231: def apply_rule1(Obj,L,R) {
! 232: dprint("-------- start of apply_rule1 ------------ ");
! 233: Obj = quotetolist(Obj);
! 234: L = quotetolist(L);
! 235: R = rp(Obj,L,R);
! 236: RR = "quote("+quote_input_form_quote_list(R)+")";
! 237: dprint("-------- end of apply_rule1 ------------ ");
! 238: return eval_str(RR);
! 239: }
! 240:
! 241: def test0() {
! 242: A = quotetolist(quote(1+sin(x)+sin(3*@pi)*sin(0)));
! 243: P = quotetolist(quote(sin(pn("x")*@pi)));
! 244: Q = ["r_sin_int","x"];
! 245: print(A);
! 246: print(P);
! 247: print(Q);
! 248: print("----------------");
! 249: print(match0(A,P));
! 250: A2 = quotetolist(quote(sin(2*@pi)));
! 251: print(match0(A2,P));
! 252: print("----------------");
! 253: print("---- makeBind --------");
! 254: print(makeBind(A2,P));
! 255: print("-----rp -------------");
! 256: R=rp(A,P,Q);
! 257: print("--------------------");
! 258: print(R);
! 259: print("--------------------");
! 260: return quote_input_form_quote_list(R);
! 261: }
! 262:
! 263: /* $B1&5,B'4X?t(B. 0 $B$rLa$9(B. */
! 264: def r_zero() {
! 265: return quotetolist(quote(0));
! 266: }
! 267:
! 268: /* $B1&5,B'4X?t(B. $B91Ey<0(B */
! 269: def r_id(X) {
! 270: return quotetolist(X);
! 271: }
! 272:
! 273: def test1() {
! 274: Rule1=[quote(sin(pn("x")*@pi)),["r_sin_int","x"]]; /* sin($B@0?t(B*@pi) --> 0 */
! 275: Rule2=[quote(0*pn("y")), ["r_zero"]]; /* 0*any --> 0 */
! 276: Rule3=[quote(pn("y")*0), ["r_zero"]]; /* any*0 --> 0 */
! 277: Rule4=[quote(pn("y")+0), ["r_id","y"]]; /* any+0 --> any */
! 278: Rule5=[quote(0+pn("y")), ["r_id","y"]]; /* 0+any --> any */
! 279: Rule6=[quote(sin(0)), ["r_zero"]]; /* sin(0) --> 0 */
! 280: R0 = quote(1+sin(sin(2*@pi)*sin(@pi/2))+sin(5*@pi));
! 281: print(print_input_form(R0));
! 282: R=apply_rule1(R0,Rule1[0],Rule1[1]);
! 283: print(print_input_form(R));
! 284: R=apply_rule1(R,Rule2[0],Rule2[1]);
! 285: print(print_input_form(R));
! 286: R=apply_rule1(R,Rule4[0],Rule4[1]);
! 287: print(print_input_form(R));
! 288: R=apply_rule1(R,Rule6[0],Rule6[1]);
! 289: print(print_input_form(R));
! 290: R=apply_rule1(R,Rule4[0],Rule4[1]);
! 291: print(print_input_form(R));
! 292: return R;
! 293: }
! 294:
! 295: /* $BI}M%@hC5:w$N>l9g(B, $B$3$l$O(B simplify $B$G$-$:(B. */
! 296: def test2() {
! 297: Rule1=[quote(sin(pn("x")*@pi)),["r_sin_int","x"]];
! 298: R0 = quote(1+sin(sin(2*@pi)*@pi)*sin(@pi/2));
! 299: print(print_input_form(R0));
! 300: R=apply_rule1(R0,Rule1[0],Rule1[1]);
! 301: return R;
! 302: }
! 303:
! 304:
! 305: /* $BITDj@QJ,7W;;$NNc(B
! 306: c x^n $B$NOB$NITDj@QJ,(B (c $B$O(B x $B$K0MB8$;$:(B)
! 307: $B$$$m$$$m(B $BLdBjE@$"$j(B: $B$?$H$($P(B c $B$,(B $BL5$$$H$-$N=hM}$G$-$:(B.
! 308: */
! 309:
! 310: /* $B1&JU4X?t(B. c x^n $B$NITDj@QJ,(B (c $B$O(B x $B$K0MB8$;$:(B)
! 311: Todo: $B1&JU4X?t$rMF0W$K=q$/J}K!(B.
! 312: */
! 313: def r_integral0(C,N) {
! 314: NN = eval_str(quote_input_form_quote_list(quotetolist(N)));
! 315: CC = quote_input_form_quote_list(quotetolist(C));
! 316: if (NN == -1) {
! 317: R = "quote("+CC+"*log(x))";
! 318: }else{
! 319: R = "quote("+CC+"/"+rtostr(NN+1)+"*x^"+rtostr(NN+1)+")";
! 320: }
! 321: print("r_integral0:",0);print(R);
! 322: R = eval_str(R);
! 323: return quotetolist(R);
! 324: }
! 325: /* $B1&JU4X?t(B $B@QJ,$N@~7?@-(B */
! 326: def r_int_linear(F,G) {
! 327: FF = quote_input_form_quote_list(quotetolist(F));
! 328: GG = quote_input_form_quote_list(quotetolist(G));
! 329: R = "quote(integral("+FF+")+integral("+GG+"))";
! 330: print("r_int_linear:",0);print(R);
! 331: R = eval_str(R);
! 332: return quotetolist(R);
! 333: }
! 334: def test3() {
! 335: R0 = quote(1+integral(2*x^(-1)+2*x^2));
! 336: return test3a(R0);
! 337: }
! 338: def test3a(R0) {
! 339: Rules=[
! 340: /* c*x^n --> (c/(n+1))*x^(n+1) or c*log(x) */
! 341: [quote(integral(pn("c")*x^pn("n"))),["r_integral0","c","n"]],
! 342: [quote(integral(pn("f")+pn("g"))), ["r_int_linear","f","g"]]
! 343: ];
! 344: print("Input=",0); print(print_input_form(R0));
! 345: N = length(Rules);
! 346: R = R0;
! 347: for (J=0; J<3; J++) { /* Todo: $B%U%i%0$,$J$$$N$G(B, $B$H$j$"$($:(B 3 $B2s(B */
! 348: for (I=0; I<N; I++) {
! 349: print(print_input_form(R));
! 350: R=apply_rule1(R,Rules[I][0],Rules[I][1]);
! 351: }
! 352: }
! 353: return R;
! 354: }
! 355:
! 356: end$
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